Outer billiards in the spaces of oriented geodesics of the three dimensional space forms

Abstract

Let M be the three-dimensional space form of constant curvature =0,1,-1, that is, Euclidean space R3, the sphere S3 , or hyperbolic space H3. Let S be a smooth, closed, strictly convex surface in M . We define an outer billiard map B on the four dimensional space G of oriented complete geodesics of M , for which the billiard table is the subset of G consisting of all oriented geodesics not intersecting S. We show that B is a diffeomorphism when S is quadratically convex. For =1,-1, G has a K\"ahler structure associated with the Killing form of Iso(M ). We prove that B is a symplectomorphism with respect to its fundamental form and that B can be obtained as an analogue to the construction of Tabachnikov of the outer billiard in R2n defined in terms of the standard symplectic structure. We show that B does not preserve the fundamental symplectic form on G associated with the cross product on M , for =0,1,-1. We initiate the dynamical study of this outer billiard in the hyperbolic case by introducing and discussing a notion of holonomy for periodic points.

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